F - Ratio Table Degrees of Freedom for the Factor

Slides:

Advertisements

Similar presentations

1 1 Slide Slides Prepared by JOHN S. LOUCKS St. Edward’s University © 2002 South-Western/Thomson Learning 

Advertisements

Econ 3790: Business and Economic Statistics

The sum of the infinite and finite geometric sequence

Confidence Intervals Underlying model: Unknown parameter We know how to calculate point estimates E.g. regression analysis But different data would change.

© 2010 Pearson Prentice Hall. All rights reserved Regression Interval Estimates.

ChiMerge Technique Example

Confidence intervals. Population mean Assumption: sample from normal distribution.

Mean for sample of n=10 n = 10: t = 1.361df = 9Critical value = Conclusion: accept the null hypothesis; no difference between this sample.

IEEM 3201 Two-Sample Estimation: Paired Observation, Difference.

1 The t table provides critical value for various probabilities of interest. The form of the probabilities that appear in Appendix B are: P(t > t A, d.f.

Chapter Topics Confidence Interval Estimation for the Mean (s Known)

Chapter 10, sections 1 and 4 Two-sample Hypothesis Testing Test hypotheses for the difference between two independent population means ( standard deviations.

1 times table 2 times table 3 times table 4 times table 5 times table

Chapter 7 Inferences Regarding Population Variances.

Two Sample Tests Ho Ho Ha Ha TEST FOR EQUAL VARIANCES

t-Test: Statistical Analysis

Lesson Confidence Intervals about a Population Standard Deviation.

Confidence Intervals for Means. point estimate – using a single value (or point) to approximate a population parameter. –the sample mean is the best point.

Estimating Population Parameters Mean Variance (and standard deviation) –Degrees of Freedom Sample size –1 –Sample standard deviation –Degrees of confidence.

Chapter 9 Hypothesis Testing and Estimation for Two Population Parameters.

10-1 Introduction 10-2 Inference for a Difference in Means of Two Normal Distributions, Variances Known Figure 10-1 Two independent populations.

Business Statistics: A Decision-Making Approach, 7e © 2008 Prentice-Hall, Inc. Chap 11-1 Business Statistics: A Decision-Making Approach 7 th Edition Chapter.

CHAPTER 27 PART 1 Inferences for Regression. YearRate This table.

A preliminary exploration into the Binomial Logistic Regression Models in R and their potential application Andrew Trant PPS Arctic - Labrador Highlands.

Mystery 1Mystery 2Mystery 3.

Estimating a Population Mean. Student’s t-Distribution.

Point Estimates point estimate A point estimate is a single number determined from a sample that is used to estimate the corresponding population parameter.

Confidence Intervals for a Population Mean, Standard Deviation Unknown.

$100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300.

Class 5 Estimating  Confidence Intervals. Estimation of  Imagine that we do not know what  is, so we would like to estimate it. In order to get a point.

Section 6.4 Inferences for Variances. Chi-square probability densities.

Estimating a Population Variance

Tables Learning Support

ESTIMATION OF THE MEAN. 2 INTRO :: ESTIMATION Definition The assignment of plausible value(s) to a population parameter based on a value of a sample statistic.

Chapter 8 Estimation ©. Estimator and Estimate estimator estimate An estimator of a population parameter is a random variable that depends on the sample.

Section 7-5 Estimating a Population Variance. MAIN OBJECTIIVES 1.Given sample values, estimate the population standard deviation σ or the population variance.

Test of Independence Tests the claim that the two variables related. For example: each sample (incident) was classified by the type of crime and the victim.

Chapter 8 Confidence Intervals Copyright © 2014 by The McGraw-Hill Companies, Inc. All rights reserved.McGraw-Hill/Irwin.

Chapter 7 Estimation. Chapter 7 ESTIMATION What if it is impossible or impractical to use a large sample? Apply the Student ’ s t distribution.

Inference concerning two population variances

Summary of t-Test for Testing a Single Population Mean (m)

EXCEL: Multiple Regression

Chi Square Review.

Other confidence intervals

Multiplication table. x

Math 4030 – 10b Inferences Concerning Variances: Hypothesis Testing

Cumulative Frequency Diagrams

Anesthes. 1995;82(5): Figure Legend:

Figure e-1. Further Meta-analysis of previously reported PD and mtDNA haplogroup associations and the data from this study. Meta-analysis of published.

CJ 526 Statistical Analysis in Criminal Justice

Inference on Mean, Var Unknown

Estimating Population Variance

בטיחות בתעשייה בהיבט חברות הביטוח

Chapter 12 Inference on the Least-squares Regression Line; ANOVA

Chi Square Review.

Year 11 Mini-Assessment 13 HIGHER Estimation.

Draw a cumulative frequency table.

Chapter 10 Inferences on Two Samples

Statistical Process Control

Chapter 13 Group Differences

Confidence Intervals for a Standard Deviation

Analysis of Observed & Expected Infections

IE 355: Quality and Applied Statistics I Confidence Intervals

3 times tables.

6 times tables.

Chapter 8 Estimation.

Estimating a Population Variance

Table 2. Regression statistics for independent and dependent variables

Number of treatments ____________________________________________

Presentation transcript:

F - Ratio Table 1 2 3 4 5 6 Degrees of Freedom for the Factor Degrees of freedom for the Residual 161.00 200.00 216.00 225.00 230.00 234.00 Upper Value = 1- p = 95% Confidence Lower value = 1- p = 99% Confidence 1 4052.00 4999.00 5403.00 5625.00 5764.00 5859.00 18.51 19.00 19.16 19.25 19.30 19.33 2 98.49 99.01 99.17 99.25 99.30 99.33 10.13 9.55 9.28 9.12 9.01 8.94 3 34.12 30.81 29.46 28.71 28.24 27.91 7.71 6.94 6.59 6.39 6.26 6.16 4 21.20 18.00 16.69 15.98 15.52 15.21 6.61 5.79 5.41 5.19 5.05 4.95 5 16.26 13.27 12.06 11.39 10.97 10.67 5.99 5.14 4.76 4.53 4.39 4.28 6 13.74 10.92 9.78 9.15 8.75 8.47 5.59 4.74 4.35 4.12 3.97 3.87 7 12.25 9.55 8.45 7.85 7.46 7.19 5.32 4.46 4.07 3.84 3.69 3.58 8 11.26 8.65 7.59 7.01 6.63 6.37 5.12 4.26 3.86 3.63 3.48 3.37 9 10.56 8.02 6.99 6.42 6.06 5.80 4.96 4.10 3.71 3.48 3.33 3.22 10 10.04 7.56 6.55 5.99 5.64 5.39

F - Ratio Table o 1 2 3 4 5 6 Degrees of Freedom for the Factor Degrees of freedom for the Residual 4.54 3.68 3.29 3.06 2.90 2.79 15 Upper Value = 1- p = 95% Confidence Lower value = 1- p = 99% Confidence 8.68 6.36 5.42 4.89 4.56 4.32 4.35 3.49 3.10 2.87 2.71 2.60 20 8.10 5.85 4.94 4.43 4.10 3.87 4.24 3.38 2.99 2.76 2.60 2.49 25 7.77 5.57 4.68 4.18 3.86 3.63 4.17 3.32 2.92 2.69 2.53 2.42 30 7.56 5.39 4.51 4.02 3.70 3.47 4.08 3.23 2.84 2.61 2.45 2.34 40 7.31 5.18 4.31 3.83 3.51 3.29 4.03 3.18 2.79 2.56 2.40 2.29 50 7.17 5.06 4.20 3.72 3.41 3.18 3.94 3.09 2.70 2.46 2.30 2.19 100 6.90 4.82 3.98 3.51 3.20 2.99 3.86 3.02 2.62 2.39 2.23 2.12 400 6.70 4.66 3.83 3.36 3.06 2.85 3.85 3.00 2.61 2.38 2.22 2.10 1000 6.66 4.62 3.80 3.34 3.04 2.82 o 3.84 2.99 2.60 3.78 2.37 3.32 2.21 2.09 6.64 4.60 3.02 2.80